本文整理汇总了Golang中github.com/gonum/matrix/mat64.Vector.MulVec方法的典型用法代码示例。如果您正苦于以下问题:Golang Vector.MulVec方法的具体用法?Golang Vector.MulVec怎么用?Golang Vector.MulVec使用的例子?那么恭喜您, 这里精选的方法代码示例或许可以为您提供帮助。您也可以进一步了解该方法所在类github.com/gonum/matrix/mat64.Vector
的用法示例。
在下文中一共展示了Vector.MulVec方法的4个代码示例,这些例子默认根据受欢迎程度排序。您可以为喜欢或者感觉有用的代码点赞,您的评价将有助于系统推荐出更棒的Golang代码示例。
示例1: StdDevBatch
// StdDevBatch predicts the standard deviation at a set of locations of x.
func (g *GP) StdDevBatch(std []float64, x mat64.Matrix) []float64 {
r, c := x.Dims()
if c != g.inputDim {
panic(badInputLength)
}
if std == nil {
std = make([]float64, r)
}
if len(std) != r {
panic(badStorage)
}
// For a single point, the stddev is
// sigma = k(x,x) - k_*^T * K^-1 * k_*
// where k is the vector of kernels between the input points and the output points
// For many points, the formula is:
// nu_* = k(x_*, k_*) - k_*^T * K^-1 * k_*
// This creates the full covariance matrix which is an rxr matrix. However,
// the standard deviations are just the diagonal of this matrix. Instead, be
// smart about it and compute the diagonal terms one at a time.
kStar := g.formKStar(x)
var tmp mat64.Dense
tmp.SolveCholesky(g.cholK, kStar)
// set k(x_*, x_*) into std then subtract k_*^T K^-1 k_* , computed one row at a time
var tmp2 mat64.Vector
row := make([]float64, c)
for i := range std {
for k := 0; k < c; k++ {
row[k] = x.At(i, k)
}
std[i] = g.kernel.Distance(row, row)
tmp2.MulVec(kStar.ColView(i).T(), tmp.ColView(i))
rt, ct := tmp2.Dims()
if rt != 1 && ct != 1 {
panic("bad size")
}
std[i] -= tmp2.At(0, 0)
std[i] = math.Sqrt(std[i])
}
// Need to scale the standard deviation to be in the same units as y.
floats.Scale(g.std, std)
return std
}
示例2: StdDev
// StdDev predicts the standard deviation of the function at x.
func (g *GP) StdDev(x []float64) float64 {
if len(x) != g.inputDim {
panic(badInputLength)
}
// nu_* = k(x_*, k_*) - k_*^T * K^-1 * k_*
n := len(g.outputs)
kstar := mat64.NewVector(n, nil)
for i := 0; i < n; i++ {
v := g.kernel.Distance(g.inputs.RawRowView(i), x)
kstar.SetVec(i, v)
}
self := g.kernel.Distance(x, x)
var tmp mat64.Vector
tmp.SolveCholeskyVec(g.cholK, kstar)
var tmp2 mat64.Vector
tmp2.MulVec(kstar.T(), &tmp)
rt, ct := tmp2.Dims()
if rt != 1 || ct != 1 {
panic("bad size")
}
return math.Sqrt(self-tmp2.At(0, 0)) * g.std
}
示例3: ConditionNormal
// ConditionNormal returns the Normal distribution that is the receiver conditioned
// on the input evidence. The returned multivariate normal has dimension
// n - len(observed), where n is the dimension of the original receiver. The updated
// mean and covariance are
// mu = mu_un + sigma_{ob,un}^T * sigma_{ob,ob}^-1 (v - mu_ob)
// sigma = sigma_{un,un} - sigma_{ob,un}^T * sigma_{ob,ob}^-1 * sigma_{ob,un}
// where mu_un and mu_ob are the original means of the unobserved and observed
// variables respectively, sigma_{un,un} is the unobserved subset of the covariance
// matrix, sigma_{ob,ob} is the observed subset of the covariance matrix, and
// sigma_{un,ob} are the cross terms. The elements of x_2 have been observed with
// values v. The dimension order is preserved during conditioning, so if the value
// of dimension 1 is observed, the returned normal represents dimensions {0, 2, ...}
// of the original Normal distribution.
//
// ConditionNormal returns {nil, false} if there is a failure during the update.
// Mathematically this is impossible, but can occur with finite precision arithmetic.
func (n *Normal) ConditionNormal(observed []int, values []float64, src *rand.Rand) (*Normal, bool) {
if len(observed) == 0 {
panic("normal: no observed value")
}
if len(observed) != len(values) {
panic("normal: input slice length mismatch")
}
for _, v := range observed {
if v < 0 || v >= n.Dim() {
panic("normal: observed value out of bounds")
}
}
ob := len(observed)
unob := n.Dim() - ob
obMap := make(map[int]struct{})
for _, v := range observed {
if _, ok := obMap[v]; ok {
panic("normal: observed dimension occurs twice")
}
obMap[v] = struct{}{}
}
if len(observed) == n.Dim() {
panic("normal: all dimensions observed")
}
unobserved := make([]int, 0, unob)
for i := 0; i < n.Dim(); i++ {
if _, ok := obMap[i]; !ok {
unobserved = append(unobserved, i)
}
}
mu1 := make([]float64, unob)
for i, v := range unobserved {
mu1[i] = n.mu[v]
}
mu2 := make([]float64, ob) // really v - mu2
for i, v := range observed {
mu2[i] = values[i] - n.mu[v]
}
n.setSigma()
var sigma11, sigma22 mat64.SymDense
sigma11.SubsetSym(n.sigma, unobserved)
sigma22.SubsetSym(n.sigma, observed)
sigma21 := mat64.NewDense(ob, unob, nil)
for i, r := range observed {
for j, c := range unobserved {
v := n.sigma.At(r, c)
sigma21.Set(i, j, v)
}
}
var chol mat64.Cholesky
ok := chol.Factorize(&sigma22)
if !ok {
return nil, ok
}
// Compute sigma_{2,1}^T * sigma_{2,2}^-1 (v - mu_2).
v := mat64.NewVector(ob, mu2)
var tmp, tmp2 mat64.Vector
err := tmp.SolveCholeskyVec(&chol, v)
if err != nil {
return nil, false
}
tmp2.MulVec(sigma21.T(), &tmp)
// Compute sigma_{2,1}^T * sigma_{2,2}^-1 * sigma_{2,1}.
// TODO(btracey): Should this be a method of SymDense?
var tmp3, tmp4 mat64.Dense
err = tmp3.SolveCholesky(&chol, sigma21)
if err != nil {
return nil, false
}
tmp4.Mul(sigma21.T(), &tmp3)
for i := range mu1 {
mu1[i] += tmp2.At(i, 0)
}
// TODO(btracey): If tmp2 can constructed with a method, then this can be
// replaced with SubSym.
//.........这里部分代码省略.........
示例4: testSimplex
func testSimplex(t *testing.T, initialBasic []int, c []float64, a mat64.Matrix, b []float64, convergenceTol float64) error {
primalOpt, primalX, _, errPrimal := simplex(initialBasic, c, a, b, convergenceTol)
if errPrimal == nil {
// No error solving the simplex, check that the solution is feasible.
var bCheck mat64.Vector
bCheck.MulVec(a, mat64.NewVector(len(primalX), primalX))
if !mat64.EqualApprox(&bCheck, mat64.NewVector(len(b), b), 1e-10) {
t.Errorf("No error in primal but solution infeasible")
}
}
primalInfeasible := errPrimal == ErrInfeasible
primalUnbounded := errPrimal == ErrUnbounded
primalBounded := errPrimal == nil
primalASingular := errPrimal == ErrSingular
primalZeroRow := errPrimal == ErrZeroRow
primalZeroCol := errPrimal == ErrZeroColumn
primalBad := !primalInfeasible && !primalUnbounded && !primalBounded && !primalASingular && !primalZeroRow && !primalZeroCol
// It's an error if it's not one of the known returned errors. If it's
// singular the problem is undefined and so the result cannot be compared
// to the dual.
if errPrimal == ErrSingular || primalBad {
if primalBad {
t.Errorf("non-known error returned: %s", errPrimal)
}
return errPrimal
}
// Compare the result to the answer found from solving the dual LP.
// Construct and solve the dual LP.
// Standard Form:
// minimize c^T * x
// subject to A * x = b, x >= 0
// The dual of this problem is
// maximize -b^T * nu
// subject to A^T * nu + c >= 0
// Which is
// minimize b^T * nu
// subject to -A^T * nu <= c
negAT := &mat64.Dense{}
negAT.Clone(a.T())
negAT.Scale(-1, negAT)
cNew, aNew, bNew := Convert(b, negAT, c, nil, nil)
dualOpt, dualX, _, errDual := simplex(nil, cNew, aNew, bNew, convergenceTol)
if errDual == nil {
// Check that the dual is feasible
var bCheck mat64.Vector
bCheck.MulVec(aNew, mat64.NewVector(len(dualX), dualX))
if !mat64.EqualApprox(&bCheck, mat64.NewVector(len(bNew), bNew), 1e-10) {
t.Errorf("No error in dual but solution infeasible")
}
}
// Check about the zero status.
if errPrimal == ErrZeroRow || errPrimal == ErrZeroColumn {
return errPrimal
}
// If the primal problem is feasible, then the primal and the dual should
// be the same answer. We have flopped the sign in the dual (minimizing
// b^T *nu instead of maximizing -b^T*nu), so flip it back.
if errPrimal == nil {
if errDual != nil {
fmt.Println("errDual", errDual)
panic("here")
t.Errorf("Primal feasible but dual errored: %s", errDual)
}
dualOpt *= -1
if !floats.EqualWithinAbsOrRel(dualOpt, primalOpt, convergenceTol, convergenceTol) {
t.Errorf("Primal and dual value mismatch. Primal %v, dual %v.", primalOpt, dualOpt)
}
}
// If the primal problem is unbounded, then the dual should be infeasible.
if errPrimal == ErrUnbounded && errDual != ErrInfeasible {
t.Errorf("Primal unbounded but dual not infeasible. ErrDual = %s", errDual)
}
// If the dual is unbounded, then the primal should be infeasible.
if errDual == ErrUnbounded && errPrimal != ErrInfeasible {
t.Errorf("Dual unbounded but primal not infeasible. ErrDual = %s", errPrimal)
}
// If the primal is infeasible, then the dual should be either infeasible
// or unbounded.
if errPrimal == ErrInfeasible {
if errDual != ErrUnbounded && errDual != ErrInfeasible && errDual != ErrZeroColumn {
t.Errorf("Primal infeasible but dual not infeasible or unbounded: %s", errDual)
}
}
return errPrimal
}