qinterp
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Compute interploated coordinates of local peaks of a function using 2nd order interpolation.
- Usage
qinterp(dxscalar, y, ip {, nwidth})qinterp(dxscalar, y, ip {, nwidth})- dx:distance bewteen x values,
x[i] = dx * i - x:x data vector
- y
- y data vector:
y[i] = f(x[i]). - ip
- a scalar or vector containing the indices of local maxima
- nwidth
- the width to be used for interpolation
- dx:distance bewteen x values,
- Result
- A vector r with 2 elements (r[0] = xpeak, r[1] = ypeak) or a matrix with two rows (r[0,j] = xpeakj, r[1,j] = ypeakj) containing the interpolated coordinates of the local maxima (peaks). For the 2nd order (parabolic) interpolation the (x,y) points at ip-npeaks, ip and ip+npeask are used.
qinterp
Lays a parabola through three points around each peak value and calculates the interpolated peak. The result is a one or two row vector or matrix.
Usage:
qinterp(x, y, ipeak, nwidth)
Parameters:
- x
- The number for x[i] = i*number or the x-scale vector.
- y
- The data vector (function).
- ipeak
- The indices of the peak values or the center of the interpolation.
- nwidth
- The width of the interpolation. The default is
1.
Return Type:
vector or matrix
Result:
row 1 = xpeak[]
row 2 = ypeak[]
