From 9807f502eb7a023be619a14119388b2a43271b0e Mon Sep 17 00:00:00 2001 From: Jason Ekstrand Date: Fri, 9 Dec 2016 09:33:05 -0800 Subject: glsl: Use a simpler formula for tanh The formula we have used in the past is a trivial reduction from the definition by simply multiplying both the numerator and denominator of the formula by 2. However, multiplying by e^x, you can further reduce it. This allows us to get rid of one side of the clamp and two of exponential functions which should make it faster. The new formula still passes the dEQP precision tests for tanh so it should be fine. Reviewed-by: Roland Scheidegger Reviewed-by: Kenneth Graunke --- src/compiler/glsl/builtin_functions.cpp | 18 ++++++++++-------- 1 file changed, 10 insertions(+), 8 deletions(-) (limited to 'src/compiler/glsl') diff --git a/src/compiler/glsl/builtin_functions.cpp b/src/compiler/glsl/builtin_functions.cpp index 3dead1af00f..17f03a3fa27 100644 --- a/src/compiler/glsl/builtin_functions.cpp +++ b/src/compiler/glsl/builtin_functions.cpp @@ -3563,17 +3563,19 @@ builtin_builder::_tanh(const glsl_type *type) ir_variable *x = in_var(type, "x"); MAKE_SIG(type, v130, 1, x); - /* Clamp x to [-10, +10] to avoid precision problems. - * When x > 10, e^(-x) is so small relative to e^x that it gets flushed to - * zero in the computation e^x + e^(-x). The same happens in the other - * direction when x < -10. + /* tanh(x) := (0.5 * (e^x - e^(-x))) / (0.5 * (e^x + e^(-x))) + * + * With a little algebra this reduces to (e^2x - 1) / (e^2x + 1) + * + * Clamp x to (-inf, +10] to avoid precision problems. When x > 10, e^2x + * is so much larger than 1.0 that 1.0 gets flushed to zero in the + * computation e^2x +/- 1 so it can be ignored. */ ir_variable *t = body.make_temp(type, "tmp"); - body.emit(assign(t, min2(max2(x, imm(-10.0f)), imm(10.0f)))); + body.emit(assign(t, min2(x, imm(10.0f)))); - /* (e^x - e^(-x)) / (e^x + e^(-x)) */ - body.emit(ret(div(sub(exp(t), exp(neg(t))), - add(exp(t), exp(neg(t)))))); + body.emit(ret(div(sub(exp(mul(t, imm(2.0f))), imm(1.0f)), + add(exp(mul(t, imm(2.0f))), imm(1.0f))))); return sig; } -- cgit v1.2.3