Scriptnode envelope ?

Casey Kolb

@lalalandsynth I'm not sure I really understand it either haha.

Let me see if I can whip something together. What in particular are you looking for? I ended up just going with the baked in unipolar modulation. It's fine, but a little clunky from a user perspective.

lalalandsynth

@Lunacy-Audio its ok , bipolar is working now , for a filter at least.

Bipolar LFO and Positive going Envelope on filter.

HiseSnippet 3110.3oc6b0DaabbEdWQM1lzRN1IJstAAArt9fCjCAIkjsE5AtRhhwJlxhRTxIEM.pq1cH0Vsb2s6tjxzoEn.sEv2b.5k9SZ50hVfh1a1mhQCP.JfMP.7kdztWJBbO3VflCsGRme1k6rKWJQQ82pe1CRb9am2ady6Meu2ryTxTWBZYoaxwGewlFPN9A.kapYu5TqJpnwMSdN9WCTQQ0FZB0ZXCsrW1RxTwvVSWFxMYSCQKKnLGOer2FWe938yQddQtIEUE0jfdYwwcKcEIXQkZJ1d4VR3FJppEDkgKpTio1iJLijt1T5p50QzVLPZNCQo0DqBuoHtZ8A33OwzxJ15lksEQzEGe+SpK2r7p5qqQq+sTrTVQEhSjgqL5EQytftpLlhw+lapUUTkK4NFXwgdok7FQhQGQFBLqhrRq78FYNKofjdsfc7fuuMh7xvRdoCk7xDB4wwPc8SoNDQnKWWUz1OkgEGNEnnq4ixlQyFpYoX2jUbsuRtmCTRwVZ0vo29BgdQBpca50Q3OHX5JUfR1dDa+fBuWuJo2BSD4K0lp4KCJoq1zXUcMEoBDcRBAEGPSjYCzG43JXB+A0gZRtihBI9Sejv7rSAlEqR2J84ElutnJyn944ROwjJF5phlAkHOc96+weRvggXc2vPHrd+c4zluFnESkb6LWu2oTVgzYnTJ.TrvbNJgnekrEcmYylT+zbAkQIe+68uygsMNimnT3dBuqXCXEcyZzNziuJBqh5H1bVDVyPGYOWhclP4Z551qpnU0uE2gDJpqaLslHh0kYeIkVUzBNWkJVPa1WyT0sr0q4RKDSxksgF4EsE43+tfqLZJzSkgw+c7oP+Yj41YRysyI95qKmn8JDIYKQFVlFwsnRoXepGQ90.vVrRdfYMquAvwXHYT9fCceFv7QKh0wt4oAkUzfDrmNF2woShsuj7sgZPy1rgFXItOuagbZz0PNmSxF08KZJpYYnawZq8SJCqorntFdDwq2VxBhmLr.dn0moRcQyPK5E4JfXxPaSYQ65lDYzD0zqq4R+BiLxyywGa2.wQ+GC8cyVOIc2CG3knz3IASb87kWvwDG42ImVqATU2.5e17r5Z5TrcrSCV.ZapTsJzjkhCkMlv1F4gzT0Ma3SCHOTRrYa4Rqb64TDhHM1ruNRnz1qqUFO8tBkQv.7zC+d2+M95ObAnJTzxml0zR59gWtShBCzkSMFDPYxjD89ntYZGZkJQh1D6..xzhCBiquDvYB6AhA1y.bzkNHLztgdwG6noW7rdXbNG+0.kWUz.h5dLcbZZpjEdO+9G5Xw9y.YFk3HEySi4xH88KN900EmeroHoKO152b7FWsXwqQSOuQS8waLxJEuJM834Kb6wutzMVvo7QtVkLiW5Fka5z9UJek7C2XrEMcp+bUrme3RydixWgl9cF+FKL7hVuyRds+VCm5pykxIsz5y+cFtxXKo4zd+Nt0XNtIUDsJBq3y+QbdKnTcUeYdcTFkPCBrqcTTeceYc2mH3esDAg4Z.MsDqYnh7pkUefAg3CeziRKr.Ttte.hST2VuZfPkPvKNilQcejVdSE+qgNqxs8EvShziFJFenB21n0BcR9B50sQb6rhH7AH5.by50Ji.tJAQyw0zfpnNBv2GF7IMcZbZBvRnlLIwWgdbJLCNMuSgYbKLDE+Dfxjv+5L6c.mjAm9FilMG+uGLsVUDD2TRlPD2m2x3lP600MW6RWHe4RW3M+1ClXvDUpqIgsWjzvDZHZBWTujpXyKQDnPDvX3kSthptzZkUtC7MS7AIhm3GkHISiHD4j3ZbIIGlu8pgQ1qYapqdIs50VAZd4jMDUq689ZKdx8Ldj8DQClYfHuB33bFPI3Oc9M5WXoC.fFiw4RzVRTPTBwdMKIh7vBYrF4qCdcPnYJoVVEOAtEY3PDbPRsHZz0W17wvuVWuknz+T50pgIJbrfb986pHi6N.+kQ0fNCYAjbEub1r9zxwizkDMEqAo5O784y5bLzHrAzzVAhGgwcMkgIr1Iwz9IAVH8eatNxlzh2s3sNPg8Sov3T7mtgL.GhvMQbreHCbM4zww69nbyovbSBPMcYJs5iUFhgUZUicWtYCo4SwPyCBzsjPN+SikPaR.SXJux2Wj.94AhCk3THPSwng5eIKH1yatagMdg6+R0WQE6xHeLNOjWKJZVEZSvB4oRgmh5lBOiD4EposiumJZNuPlk2Ducf7NKdoXnYfvovwsjgQa4dVAbvfwVrYWir7Zv0oi59bmkX4grldaTAW2Px+peI94A4ZmjSEJIOpPHjLBVAKI69NYI4Dfzoxlc7wSOlC1Mu.1GfVdUAtter9EgP3oCkveQtvFqSuEGqGfP2IogbpMZgiwhUBfkR0rHs3.JKmATC8+TNEtunovBVNfl+lpGvu8zCdQttWO.IGXjMevP+w29Y24mtAxlSBncV6JBLlw.fZ0U8KQRPkH372+sac3RBP0n+q9TLNAVBjIRIB1oTHRDwEGe4kd+68W9O+sbAYJLe6WIQTVNTIDN+iUR1YkJ+iO5+8yG6W+YATRLfhq4WDbZJLKRAQesDd91mkM.lflQFydVMpjwSjgyiERvbFs7YFZSGnZs653O.fMRdNpPaxSD9jcRrLw6+w+vu3p+jZON2z2F42skENfc3QTeyAYUnhCLgRPbPPB.b1j5uaJ2hif.mGDLgr7h5kUppIp1B7beaEvyQXswDfBPn7J3czoUud8mcGT69hbrRvSRTHyFszHOVKby0BCQkjXg8T.IUnXPWYGftLGon8airwNRfMuSlLQxGb3OxDEC1SGBWxI7YuPRUwHSP6ENytTLNFE0N7Dp+472+M9YO+YAPQgvqNRjBH6QEeuC.pMA8KqC574arbEcUULw3W175.4lZh0TjrR0dM2usF2wH7toxs91VxMg608wNDU2MeYyw9ES8Me7u4w4nVYc9bV76x9CpuUBB2dMQG2cq88n5QGA8HoJvtBBBdCTSNXz2bQbSJKBB2d.vT5ndlryas3uVtOrEPcyp4QQulIZgd0SgJp3YYr8aLsLQIuacszAG6HQLbrGUwtlfJSbNiIQPrqc0RZA1jXGvTDMKerzfNGvMqTnxNv4uDn6Cc6do6rcb+wbWsLzv21M5OiPddhu8L6wOB+7sBvKt0zOu3V2MmW9ue7u6Kuv+5yI7RLv7bAHgysUfWj8gsqumMzw9rOLL88rcA85e+TIe6SsQEbQKSTeUyeaoWI+Sbltz5jI4Q2tMi6f7VWGHpMIvGNm7PUwlQcaqabLBHLyPs6OTlCPNDcn1MH22yAP2fPlsaa+VyFU2u085fbdQg8bfhWTfUbDGHiMesrZPjTV1qkxsniXQlZqHTtXHKwvwsQBE5xEc5qBIN0o6JJ2dYxne.Kvmk5jbqhO1p61y.leTKDQC47YrCa3k6C2BSo9vsHpkDfVm.x.85O1mpNMpKiDY2E+Xa6XsP9Rd7EqEWafam8NbuzA+tHLKwc2OGbrTNd2BiNQboiI36mg2NgiJqhpM1mZtt04dORF.RmJiukXHGpA2FTsB54A+AAdduH2Rr7xDHWOkF52VUn5Ln5SjBj.ANiLZh.9LeEhlTzU8ITV1Ya3NrxyAmqM.XZsFIcN54aFoRiGxmtE59.634eNWv4c7cXdGFs+QGY.AZQRa7hzcKHzdPFz5fp0Ux.Or+AjCTHp6dxg69o8LB62ZpW+4+8q7Z8nb3b.2SreRwtSgXqOWnsuaqtUXzZS0XEFLePXGBzKVZFxkJDcL.ep2XvHvymG1PQB5d1ZyCsVyV2XO+7QNj6sXB9BKw6VL4UAtWPRc3RLou85KwjLru4.kk0+M8fccM+UmlkuZgYuBH1KCa7ScyjolmRnjnluWFJc1NdbZ4b.ZWFh3F447NTVr2KU0UsfDTlYXuDs7xNKa1AOEtft63c5+xDgo9a7wy02cRwwWlJa2KSk3tzXYE7YB10bLgFeYjNeEw5p16lWqJrWSZsc8lbQghJZHum18tgS36R404YugSRd339e7vzMGwtgFJxtYDPRuWrb6dQeTSTxTeYI5UE.43CSxAw2ZjKd13fYwoSlgqAELD1u5zb0PFvWVRBO63sPiOg2lr8PaFoGZyn8PaFqGZyU5g1b0dnMWaCaCdsS7s3QM57eTFklldITxy7QQw8+kfNhzB

Invert envelope added.

HiseSnippet 3129.3oc6b0DababElTqFKq0RN1IpsNAAAac8AGHmEZ2Ux1B8vRIsRVJdk0JsRNInAPkhbVIVwkjkj6JuIs.EHs.9lyw1h1zqEEEA8nyIazf1S1.A0GZO5zaENGTKPygdIc9gb4LbojV8O0O7fzN+w46Mu48l26MblR1lJPGGSaAwtmugETPrGP4FFtqL1JxZFBSUPP70.Uzzcg1Pi5tPG2EcTr0rbMLUgBi1vR1wApJHJl3V35K1cmBjm0yOprtrgBLHKAg6Zpo.KpUUyMH2RR2VSWeBYU37ZUYp8fRSoXZLlotYMD1R.FPvRVYU4kg2QFWsN.BhmYbUMWS6xtxHbIH14nlpMJuh4ZFz5eWMGskzg3DYDJidQzrmvTWEiX7uEFaEMc0R9iANBnWZofQjDzQj9.Sqop0L+fQlKPJHUPKXGOD6XyfWFV3MPjvKSDvSfAccRQGBDlp0zkc4QFlc3UfloAGxlxvEZ3n41fkccnB2KBJo4prRz3siHvKhQseiWOleufwqTAp3F.1NAS7t6TN81XhnXoVDMeYPIS8FVqXZnoLAQlj.ntAzDY1D4QAgIrg+3ZPCE+QQoj+oeizrrSAlFKR2L8kjlslrNyn9kDFXjQ0rL0ksCyQd9rO7SdT3ggDs2vPDjdms4zluMnIQkZ2LWemiTVlz4oHE.JNwLdBgnekpItyrUSped9v7nTu+C9O4w5FmJfUJ8.o2QtNrhocUZGFPWEgKi5H1blGV0xDoOWgclP4plltqnYrLuF29jJZZZMtgLhzUYeIkVQ1ANSkJNPW1WyX0bbMq5iEhJ4xtPqBxtxBh+.v0GLM5oR+3+N7Xn+jal8lzB6cruNZyIZuBgS1jkg4owbMpTDyIdD6WC.qwJ0Ql0rdUfmxPxn7QGbedvrwKv5o27bfxZFPhsmdJ2woSg0uj5VPCncK5PCsD2WztlbZ01lbNihKp6m2V1vwxzgUW6iJCqpMuoAdDIn2VvAhmLLGdnkSUoorcjEsd9IPDYjsorraMaBOZjpl0L7wuTtbuHuXh8CKN57TSe2p0SFn8MG3knXrKvHSVn7bdp3H+N03F0g5lVP9YySaZXRssicZvbPWaskWFZyh3HIiQbcQdHMVM65bR.EfJxMZIWZkaMmhPDzXydRDSokWWyLd98kJiLCHPN7G9v236734f5PYGNIqwUL4MubuzJLPaN0nW.kHSQj6i6po8vJkiDuAaO.xzhiBiquDvaB6QhA1yC7jkNJLztodwm3joW7rdXbQO+0.kWQ1Bh5dLNNGMUpIdWd+C8zX+WAYFj3HEyS8Yxn7iJN7jlxyNzXjzkGZs6Lb8aTr3Moom0pg4v0ysTwaPSObgIt2vSpb647JO2MqjY3R2tbCu1uT4qWn+5CMusW8moh6r8WZ5aW95zzu8v2dt9m24sWHn82s+z2XlzdoUVa12q+JCsfgW64cbq9LBipI6TDVgy+Qbdyos7JbYNIJiRnAA10NJZtFWV2+YR7qkHIMScnsibUKcjWsrxCLVH93m7jAjlCpVi2.wQp4ZtbnPkPrWbJCqZbPqfsF+ZnSqcOt.dR3dzPwvYU3t1ZsHmjOmYMWD0NsLx9.DN.2oV0xHCWUfn43FFPcTGAD6.a7IM8.3zDCKgFpjDeC5wqvL3zhdElwuvHD7SBJSB+q2r2d7RFd5aBZ1Bh+Av3FKiLwMshMDQ8EbrtCzcMS6Uu5kKTtzkeyueuI6MYkZFJX8EorrgVx1v4MKoK23pDFJDYXL7ZoVR2TY0xZe.7MS9gI6N4OMYJlFQ.4n3ZbUEOhu0pgsr2v01T+pF0ptDz9ZopKqWK380R7j2w1ibfvZvDCD4Ufff2.Jw9Suei9El6..nwXbtDokjSHqfHuFkjQdXgTVi70AuNHzNsRSshmA2hLBH.GFpEQitbYKl.+Z88Vhh+wLqVECJbrf7986noh6Nf30P0fNCYNDeEub1zbR43Q5Rx1xUgT4GwN3zNm.MBaAsc0f3QXbWSIXBo0EF6cAbPx+tBaHYRKd+h11.D1IEgcSs+zOjA3PDtEriCCdfuJmMb7tCJ0bVL0jDT0TkhUNRoOFRoYM1eolMEymkAy8BLcTPN+SikPKb.aX5fxOT3.7z.wgRbJjQSIng5eAGH1yag6hUdg6+R0VRG6xnXBg.KulW1dYnKwVn.QJ7TT+T3YjHuPsc878Tyv6Exr7l78Bk2EvKECsCENEAgErrZI2KHgCFLViM6ZjkWEtFcTmycVhlGxZ5sfBg1Ax+5eE94yx2JjSGIjGTJBHiLqfEx9uSVHmDLP5rYGd3AFxy1sf.12ree5SvOeUdg1erd8H.9.QB70yG0X8.ayw5dH3NEMjSsfEAFMVIANZKmEIEGRX47fpn+m1qvCEIEVikCI4ukxAh6N4f0y29xAH9.Cu4C66Su0W9A+7Mg2zEf1YsJHvnFC.pVSmmijjxQv4e3q25XMGnap5JzHclXEKXuRfHYLmc70W88eve9+9OxGlnvzMuPhrpZjbHb9mJjr2xU9Hk+3e68V8KyyKjXAkWkmEbNpYVjBh+RIhhsNKqGLflRESdN0qjIfkgyi0jfYrZ5yLzkNP0b20we..aF+bPoV3mH6S1KskAYoxO4eciOp5SyO98P9c63fCXGdDkaNHq.U2.anBDGDjPFNaS82MsewwPCm6ELhp57lk0V1PVuowycrcLdNFKMlDLADptDdGcZ1q31z2m92yyxA6hHPlMdIQdpT3VKEFgHIQC6YAJ5P4vtx1CcYNRQG1JYSbhvxvMRkIh+fC+Ql3Xvd1fvkzEm9BEcMqLg0W3M6Ry5Tqn1imP8Uy9v23W7hvVQgrWMWrxP1SJ9dGxn1jzurNn2muwhUL00wfgm275.0FFxU0TbR2ZMOr0FugQ3cK4acrq3aROn8icHpta8xlC8KG669ze6SyS0x584rvGPvOqljP7Ezc6u09AndvbnGEcI1UPHAZH2ow54.cE80yyyBbfFpgC.puSOjxhgd7zCXLSTOS17ylzWSO31FN9vp7i5.Ql3kCDA5zhKN2m3v1sBlMpnc8t2yUhbwLWINo59PRJOw6X9DCcensrpHz9z6YOKQxhij506LF5jFU1QNWVAsezyOHinvFtEk9FrDYDzaG4mbjmmwsskz8876EhV7qIOs3W2slV9eexu+qu7+9KHzRBvrBgfvE2NV3k8wsJumMxw9rONJ48rsAd42RaxmeVKnPHdoh5aZ76J8JEdl2zklGNr.b62Lgixe8.gBbVR74ip.TWtQbW25FnQ8LLDSes5RZliP9jdr1ST+2yQPOQQpsaYKuyFW2x6C53LeEoCbCEuhDK6nafJV80h5gsjxwc0z9EcBK3faGlxUhXIFAgMioPWtXS+rP5AYG68VjL5GRC7EnNI2r3S05t6Tfwa0Bg0PNhL6wJdE93swTpOdaZ0RRPyCgZnd8mwIpSi5RtX6GRQhccrVHeLUbwZwWG3tY6aOHcvuMByR29aoFNVJmtgswmHtrgI37r+LdhrZ5tXepEZWm6CfL.LP5LbKwPNWIraZwqN4eQRTLHxsDMuLAxMPng94sEoLCp9Dt.IPfSohlHfO1cQHIEeEehjj81Iziqzb34Z8.F2ndJuS++VAUZ7P97sQ22xqK77NwMXdG1Z+SN7.hoEobwKR2tFgtuyCBr8ODefZh59Ge39e9N1B62ZrW+E+yq+Z6P9vEA9WZBojaOAhs+bgV9z4ZWlQyMUikYv7M4cLTt3h.JVS4GNo8S9QyS2dawO71w78SMTq+nCONwBSQtgsnTO9HfxXslnXAXcMEn+AMu.zYUWSqC7CKbe9WoO3aumfqzmuEv+1BaCtQe53f9F8IC6aNTYY4u1SbqYvWcZVb0BSdSfHuLrQx1OSlZdVoRxFbuLT5ra3YKWvykmxPD0nNSvITj8RZqltCjXueF1aTtfryxlc3ijNn8Nqy72rNL0eyOq5bWPKmdyBsauYg51Gik0vGPd+EFIX7kQx7Ujqo6tedGCwdmA1xc8yUjJpYf7ic+659QrM4WWh859I0wiKC0iSWiJ6GRnH8lw.N8AwxsGD8QUYEayEUn2aFjyROIGDcaPtEl6FLMNcpLB0oFCgivw.BUQJvWTQAO63sPiOQ2lr6f1jaGzlA2AsYncPat9NnM2XGzlatosAu1I9JsoJc9OJiRiSuQVEY97zD9+.uMJtz

I am going to try and build a proper analog synth modulation system , will post here as it develops.

Hmm. found a problem...
When the cutoff is low , and the amount is high the lfo "folds back" and the negative portion goes positive.
Also happens when its when its maxed out in the other direction. No idea why at the moment.
For this purpose i cannot use Sig2Mod or I am back to the default behaviour.

Not finding a solution for this... hehe, it should not be so hard to get this to work in the right way .
Anyone have ideas for this ?
This can be somewhat fixed by limiting the LFO amount , I think its possible to hit a sweet spot...

lalalandsynth

Amount set to minimize lfo foldback.

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Christoph Hart

Can't you use the math.clip node to prevent the foldback?

lalalandsynth

@Christoph-Hart I tried that , it only clips the positive part of the lfo.

If I could make a Max and Min clip , it might work?

lalalandsynth

This post is deleted!

lalalandsynth

@Christoph-Hart
Here is a patch with the amount set to a usable range , as you can see there is a bit of foldback with the amount set at max and the cutofff at the "lowest point" ( I have to limit the lowest point as well to minimize foldback)

So ...usable but would be nice to be able to clip the lower point.

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Actually a math sqrt somewhat achieves this , but it offsets the cutoff point.

HiseSnippet 3326.3oc6cs7aiabFmzxiskV6M6ltMMEnnPHnG1.uQPTxuD5Aqc8irNq7ZYK6MonAXKM4HaVSQxPRIuJA8VAZts+CTz+.5ghhhdH.8PBZAZuDDTfdp21doWJJPPA5414EEmgRxRVVxlxw5vFOO3LeyuuGy22GGNorqsFzyy1URN49McfRxyBpzzx+30NV0vRZq0kjmArOzyO8xROpoipmGTWRVNw6haUN4jRjee8pOR0T0RCFVkjzyrMzfkLpY3GVa4hOwvzbSUc39F0358BE2Ry1ZMaS65HJIAHqjip1IpGAepJtaS.jjmZCcCea2J9p9POI4IejsdyJGaepEs+Oyvy3PSHtfhTEz.QqdSaScLEiqUZsiML0KGrh8jPCZ4v0eB55+dfsMzMZUeHNbGRCoCeBd7Pdhyh7T3Iur8M4IwQcSRoNDQXqW2T0WjxvrCVCF1VBT1VV9PKOC+l7rqqTx8tfxF9ZG2Y5chNPuHF0nldYL+4.aTsJTyOjXmDr4GLb4zY6jfnb41TDecPYaylNGaaYnsogoOzkPPIAzBJmg9njzltvOpNzRK.EKl529KKtKuH.B94T.eyh6VW0TD0K9HCGaSU2nbjWs6m8q97nvPhtCC75icXoOYeJ17FfVKpzWDY8D8GCqGLoaSoT.nzl6vTBQ+U5VzsRuDpe0pQ4Qo+vW9eVEaabqPVYwWV78Ua.qZ6ViNggqqRviPSDeM6Cq4XirdqwKITolss+wFVGIZw8dEKYa6rgkJZoqyOHkOV0CtS0pdPe9gYs5d910BnEhI4J9Pm0U8Ukj+wfkVHC5W04w+ag0P+S9cFNkkFdBZSzmBZeKBmrEKCySi4VToTrf5QreO.rEqziM6Y8cALigDTd7gtuMX23EwxradKPECKHwSSlwcb4zX6KoeWnEzsManQ1h6u1utb5z2tbtilOZ522U0xyw1i2V6mWAVyXeaKLhDNaG3AwBC6ggVASk1ptcroud0MQKxN9LUT8q6R3QOrlccq.5uX97+qUkSz27jygquSdiquCQ2AdMJMNM3gOd8J6wLwQ96zaX0.ZZ6.Ekl211xl5aGuXvdPeWiiNB5xSwcbY7PeeTDRqU2sgfFv5PM0lsUKsysWSIHhz3q9wHlRaCWqJd0mVrBxMfP8vexm88+NewdPSnpmfl0FZ1htWdtf8drMNnOEMlCPWjoI58wcyzLZkxQh2D6r.hXw3.t9Z.l.6XAvda.SWZb.ZOyn3SLtEE+fuK.eTE2kEiFnxwpNPzThm6aQKkdyOPLlPlU5+LPYARvSb+Zrih1OsTgGaqt6hqQJWYwSeZgFKWpzJzx65zztPi7GVZYZ4Bqu4KJ7XsmrGq87qTUoP4mToI64OrxRqOeiE22k0+cp5u67k29IUVhV98J7j8leeu26fvm+YymY4cxvJqc5t+n4qt3AVrmWLXsF6H8HCUuRvpBwLhqaOiiNVnxGipnLBD32unj8oBU8o+shh6eTr3NMftdp0bLQQxxqCv4U3W7keY1h6A0qK5T3Cq6aeTjziP7QbKKm5Bj15tFh6atswKDRxIg6QS+hfmfQ8Paf2bSZO659nU31pH+.PyM3o0qUA4fpFDIKaYAMQCNPdBrSlzxYwkINPBszIE9enerFUvkkYMpDzXGTvSApn4Z33yjXmkULpHaBZ0Rx+ZvFVGgbkMilKDshW2y4oP+SscO49u05UJ+Vu8ObtTykpZcKMrcgzNtPGUW391kMUadeBSDhb.F9fzGZZqcREiOF91o9jTIS8yRkl6gHD4iv839ZrEe6cC6Aukuqs48spW6Pn6CR2P0rd330Vdii2rF7hAh79WRhAnD+LY+M5uvbG..gw3ZIZHo1TUCs7ZVVEEIExnLJlF79cP2LZsr9ME9ITjPDbHol.jSpDBaiTYVI7vxGUzZ10pgIIbFeX+86animL.He1rL4i8PbU7lVaiMqCxgrYdLVm1UsFjprfg2PQI7.Km.AuNPWeCHFdwyKc0RVWSiI7oAdHEdeottFoMOZVXcg9.T5KI0EyfrBfyBXO3DWpvOe5l6xBYB5BYF7BIEnlsNkLEVE2iaUzpGixEROn4jbz7b.aOMTn8zLEzF36ByD19kK3KR7j3DwkP9BkflA+C7f3.pkdF1VEcpJW+PSbrfDiOgNUsup6QPehaNgJS3IHnDVRDEfoqe.xssgE2vts5KZUZAzh9TnKK+H3VOvwgq7BjL5hMGyrFdB7TJrRKSMkP1XlaFj5GRA.xlQgiXlDnrn.0PvMdxYZTEnebjDcL3IpTnZxkqPgrKxbzJLi5r4IIHelUJjcgk5OxDuJEHxkh.YJBzHoC8FylkPWoo47galj3rjjB3YbTNjJVDI4aCpg9uYXMd4JFyqQpDUirmhnxChHpRODQU3f6oPb+rcFwmFPGQdwTNvF.pU2TDmSQwYb8WYXb1wYLN4jIl+W7F+8u5urJOROEFoUheP8ESbN0UKTi6Y9BsQxsaTA.T006H3iq+F47ASN+St2u4c+Ge7uWPNOIvEpAwQOFwODWZPCYBZN1.5s4UxbfGpquucEiirTM42l574YxUIqJEXSHT+Pbpta2xOyOWFiHWrhQ8MSVinwpo.dejajP8tEy6GbCBXOMP61XIxI3YHznuOCVh7CP8ncVRXdoDxX3vwlkbhPrlKQSsPbty2AGty8RG4P+v9FxCBrO8yWkmMv8xj5jIsfAmWUYZfCT8jbQYHj.qvsbUpgzIzWVt8MDmEO6aoSDtZTUIjAgqiObgcbZkHLnOEVZczXHhvcQagPagLuffVFlQ1rwKbbgdd3DriwLAgLwBbJSy.zLgpQCKdVp5Dooa19evCknCnNSkoCoP4JNQPmcxellF2bPpcTtxx9SWHyDhnqogStNtCAtk3lAoXrLrhfXKIHsEhGAoMFCqSBdGkHlC7HI2ORBcB7zD2XrxMyYAqYilTxKVIXQw4v74xYytZijsyTt3xNSWW2KZFPmrnGO2LZ51rxqbiU9gQVhVboHgXopqmO9kPHkw6DBEI5oTzSjMjcr+ddUaSS77Jh6eOfdSK0ZFZdYZumWg9leFu3vdxUl37yUlBnDMfonLFVW5Y3R4Uxu7JruXM1AdrUXY4WX4L886.ZjSeICNmWgDXtbKmoCdkk+FuxF5N6R76Zb1mrvjMe9bIiy7DM4NJwjj6vay47tuvHLsOYiso8oc+oyei+ziL+oSQwY12fYbxe59dq6Ho8IHg6XkCg0ybfpzS2XFTaiSoHDzOud1KA01tbNTX9HzkWYa+dBZxyQ7.PgLEDHcZO3ocZe5IkuzBKqPcLIAXWoVi+BnQqOIs2A87BmalUhPY3ND4jyrxYRXgm2HxA7UXljtBLYjDCtYUxlO3HcG7U0xGtUVkAi1FQGLKgSB.VeNNppqbgT0SF+T0ICaLUkNelUhapz88QH7FE5t919Rg+7uWGZp1LF6cRW7HYJt0w8ZOoIJiGYM45RlRXiPrMQITChscBCy8MzCyIxla1Qz6xRQzAhj.cr8kmaF0IBO+SxDzz06DH2SvlzAdC6Y6BTSMU2EW0lE4W1KdNARiX76Nz7yzp4aL30GVThtOOA6IedsCESd4VnmDXt9Y29TfV2PEsL0snRNAICZR6xGSRZ24UdnGIpibNwERTWfIoA8rYMBRZTejTtjAuDSbl2t4zWMpyPWWKHOCGYOESECEvKNdMN5dFvxYKjEERU6wJ1qXYZ89+ph98O+c+ghxxg4pmXyiK08gh5zCkeGkzQ8mftDGg1RGwcwe.8cP9uabABRtxnVpuiKK16VdzrttLUkYRKyB1vpQZ1kwyYQI8oXBQyST.oCyIY2oz93sANS2P54xq6yJeQN9WnCdQXgTmUFxrvoIa5dtbmZF7BM6.vIuKH3F3Is54gcN7P1VutNdjk6DwONpebW.kXRGDG9PBUU5STk85wGM1aHGkuKY.ct..kbJmtbEQYm.zqOf4s.kpZmthCRCan.k3VWNeehlheX5c8kOegA1d9QUS6PDapKdgeCzs1sBiwCQSpIm7O8eu+G9x+3+d09CmoeFuWFdbfwobCeo1C1hb8oRWe368CNGykkWG1vPCFbiBsNz6DeamK8aHl6EbeMhuZFCuuF+1ffqB1tbcMNwk800nB+HGosbh2oc90sD6NsJgdgWdahVdb86NECpjqmyTrrpkvfgJmqqWhPRrXWq.QqF8cBufJ3uAdqa5AIw0ovecAGVcN9pGM2NjfatcHGh2NjICnwJF3K+n.+QIz3qiTsqpV2zeTdOQxeuO21803OnXICKnp6n6JaTtO4WuI+U1X5qGWn8It1eg1ewzPQlGiAb5KicUuLliZpZt1OWidmnQRCFoFz51h7+IMRB1FWNshTiPWaxJUCY.+4ZZAeDSc9YxM.OS9A3YVX.dlEGfmYoA3YVd.dlUNymAu2I9JJrFU9GUQ4Mn2p9xsRysbBo+OXt9lOI

Christoph Hart

Yes, actually a math.min and math.max node makes sense as it mirrors the Math.min / max functions in JS / SNEX.

lalalandsynth

@Christoph-Hart yep, that would do it.

lalalandsynth

@Christoph-Hart btw , is it possible to tempo synth the osc/lfo ?