--- /dev/null
+# Created by Octave 3.6.1, Fri Mar 30 13:10:46 2012 UTC <root@t61>
+# name: cache
+# type: cell
+# rows: 3
+# columns: 6
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 10
+catmullrom
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 494
+ -- Function File: PP = catmullrom( X, F, V)
+ Returns the piecewise polynomial form of the Catmull-Rom cubic
+ spline interpolating F at the points X. If the input V is
+ supplied it will be interpreted as the values of the tangents at
+ the extremals, if it is missing, the values will be computed from
+ the data via one-sided finite difference formulas. See the
+ wikipedia page for "Cubic Hermite spline" for a description of the
+ algorithm.
+
+ See also: ppval
+
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 80
+Returns the piecewise polynomial form of the Catmull-Rom cubic spline
+interpolat
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 5
+csape
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 741
+ -- Function File: PP = csape (X, Y, COND, VALC)
+ cubic spline interpolation with various end conditions. creates
+ the pp-form of the cubic spline.
+
+ the following end conditions as given in COND are possible.
+ 'complete'
+ match slopes at first and last point as given in VALC
+
+ 'not-a-knot'
+ third derivatives are continuous at the second and second
+ last point
+
+ 'periodic'
+ match first and second derivative of first and last point
+
+ 'second'
+ match second derivative at first and last point as given in
+ VALC
+
+ 'variational'
+ set second derivative at first and last point to zero
+ (natural cubic spline)
+
+ See also: ppval, spline
+
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 55
+cubic spline interpolation with various end conditions.
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 5
+csapi
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 151
+ -- Function File: PP = csapi (X, Y)
+ -- Function File: YI = csapi (X, Y, XI)
+ cubic spline interpolation
+
+ See also: ppval, spline, csape
+
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 27
+cubic spline interpolation
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 5
+fnder
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 104
+ -- Function File: fnder (PP, ORDER)
+ differentiate the spline in pp-form
+
+ See also: ppval
+
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 36
+differentiate the spline in pp-form
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 5
+fnplt
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 96
+ -- Function File: fnplt (PP, 'PLT')
+ plots spline
+
+ See also: ppval, spline, csape
+
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 13
+plots spline
+
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 5
+fnval
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 100
+ r = fnval(pp,x) or r = fnval(x,pp)
+ Compute the value of the piece-wise polynomial pp at points x.
+
+
+
+# name: <cell-element>
+# type: sq_string
+# elements: 1
+# length: 80
+ r = fnval(pp,x) or r = fnval(x,pp)
+ Compute the value of the piece-wise polynom
+
+
+
+
+