Called with two arguments LambertW(k, z) (rendered Wk(z)
) represents the k
-th branch of the Lambert W-function.
Called with three arguments LambertW(k, z, r) (rendered Wk(r)(z)
) represents the r
-th derivative of the k
-th branch of the Lambert W-function, with inherited branch cuts.
LambertW(k, z) is equivalent to LambertW(k, z, 0).
The following table lists conditions such that LambertW(k, z, r) is defined in Fungrim.
|
Table data: (P,Q)
such that (P)⟹(Q)
Definitions:
Fungrim symbol | Notation | Short description |
---|---|---|
LambertW | Wk(z) | Lambert W-function |
ZZ | Z | Integers |
CC | C | Complex numbers |
Exp | ez | Exponential function |
ZZGreaterEqual | Z≥n | Integers greater than or equal to n |
Q | Rational numbers |
Source code for this entry:
Entry(ID("6da738"), SymbolDefinition(LambertW, LambertW(k, z), "Lambert W-function"), Description("Called with two arguments", SourceForm(LambertW(k, z)), "(rendered", LambertW(k, z), ") represents the", k, "-th branch", "of the Lambert W-function."), Description("Called with three arguments", SourceForm(LambertW(k, z, r)), "(rendered", LambertW(k, z, r), ") represents the", r, "-th derivative of the", k, "-th branch of the Lambert W-function, with inherited branch cuts."), Description(SourceForm(LambertW(k, z)), "is equivalent to", SourceForm(LambertW(k, z, 0)), "."), Description("The following table lists conditions such that", SourceForm(LambertW(k, z, r)), "is defined in Fungrim."), Table(TableRelation(Tuple(P, Q), Implies(P, Q)), TableHeadings(Description("Domain"), Description("Codomain")), List(TableSection("Numbers"), Tuple(And(Element(k, ZZ), Element(z, SetMinus(CC, Set(0)))), Element(LambertW(k, z), CC)), Tuple(And(Element(k, ZZ), Element(z, SetMinus(CC, Set(0, Neg(Exp(-1))))), Element(r, ZZGreaterEqual(0))), Element(LambertW(k, z, r), CC)), Tuple(Element(r, ZZGreaterEqual(0)), Element(LambertW(0, 0, r), QQ)))))