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add tube thickness

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This commit is contained in:
Daniel Weschke
2026-01-10 17:35:31 +01:00
parent d2f06d9e4b
commit a2aed01d84
1 changed files with 59 additions and 22 deletions
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81
src/fvr/structure.py
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@@ -1,4 +1,6 @@
import math """Structure :py:class:`beam` and :py:class:`tube` objects.
"""
import numpy as np
class beam: class beam:
"""Euler-Bernoulli beam. """Euler-Bernoulli beam.
@@ -19,16 +21,16 @@ class beam:
self.rho = rho self.rho = rho
@property @property
def V(): def V(self):
return self.A * self.L return self.A * self.L
@property @property
def mu(): def mu(self):
"""Mass per unit length (or the product of density and cross-section)""" """Mass per unit length (or the product of density and cross-section)"""
return self.rho * self.A return self.rho * self.A
@property @property
def m(): def m(self):
return self.mu * self.L return self.mu * self.L
# return self.rho * self.V # return self.rho * self.V
@@ -103,12 +105,11 @@ class beam:
""" """
a_nLopi = [0.596864, 1.49418, 2.50025, 3.49999] a_nLopi = [0.596864, 1.49418, 2.50025, 3.49999]
a_n = a_nLopi[n-1]*math.pi/self.L if n < len(a_nLopi) else 0 a_n = a_nLopi[n-1]*np.pi/self.L if n < len(a_nLopi) else 0
return a_n**2*math.sqrt(self.E*self.I/self.mu)/(2*math.pi) return a_n**2*np.sqrt(self.E*self.I/self.mu)/(2*np.pi)
class tube: class tube:
r"""\ r"""Long thin circular tube uniformly loaded with external pressure.
Long thin circular tube uniformly loaded with external pressure.
Elemental ring of unit width (h) Elemental ring of unit width (h)
@@ -123,27 +124,31 @@ class tube:
""" """
def __init__(self, r, h, E, nu): def __init__(self, E, nu, r, *, h=None, q=None, s=None):
"""\ r"""
Args: Args:
r: mean radius (r_a + r_i)/2
h: thickness
E: Young's modulus E: Young's modulus
nu: Poisson's ratio nu: Poisson's ratio
r: mean radius (:math:`r_\text{a}` + :math:`r_\text{i}`)/2
h: thickness
s: internal stress
q: external pressure
""" """
self.r = r
self.h = h
self.E = E self.E = E
self.nu = nu self.nu = nu
self.r = r
self.h = h
self.s = s
self.q = q
def critical_buckling_force(self): def buckling_force(self):
r"""Critical buckling value of the compressive force. r"""Critical buckling value of the compressive force.
A long circular tube uniformly compressed by external pressure. A long circular tube uniformly compressed by external pressure.
.. math:: .. math::
f_{cr} = \frac{E h^3}{4 \, (1 - \nu^2) \, r^2} f_\text{cr} = \frac{E h^3}{4 \, (1 - \nu^2) \, r^2}
References: References:
- Timoshenko, Stephen P., and James M. Gere. 1961. Theory of Elastic - Timoshenko, Stephen P., and James M. Gere. 1961. Theory of Elastic
@@ -152,18 +157,18 @@ class tube:
""" """
return (self.E * self.h**3) / (4 * (1 - self.nu**2) * self.r**2) return (self.E * self.h**3) / (4 * (1 - self.nu**2) * self.r**2)
def critical_buckling_pressure(self): def buckling_pressure(self):
r"""Critical buckling value of the compressive pressure. r"""Critical buckling value of the compressive pressure.
A long circular tube uniformly compressed by external pressure. A long circular tube uniformly compressed by external pressure.
.. math:: .. math::
q_{cr} = f_{cr}/r q_\text{cr} = f_\text{cr}/r
.. math:: .. math::
q_{cr} = \frac{E}{4 \, (1 - \nu^2)} \left(\frac{h}{r}\right)^3 q_\text{cr} = \frac{E}{4 \, (1 - \nu^2)} \left(\frac{h}{r}\right)^3
References: References:
- Timoshenko, Stephen P., and James M. Gere. 1961. Theory of Elastic - Timoshenko, Stephen P., and James M. Gere. 1961. Theory of Elastic
@@ -172,17 +177,17 @@ class tube:
""" """
return self.E / (4 * (1 - self.nu**2)) * (self.h / self.r)**3 return self.E / (4 * (1 - self.nu**2)) * (self.h / self.r)**3
def critical_buckling_stress(self): def buckling_stress(self):
r"""Critical buckling stress of a long thin circular tube uniformly r"""Critical buckling stress of a long thin circular tube uniformly
compressed by pressure. compressed by pressure.
.. math:: .. math::
\sigma_{cr} = f_{cr}/h \sigma_\text{cr} = f_\text{cr}/h
.. math:: .. math::
\sigma_{cr} = \frac{E}{1 - \nu^2} \left(\frac{h}{2r}\right)^2 \sigma_\text{cr} = \frac{E}{1 - \nu^2} \left(\frac{h}{2r}\right)^2
References: References:
- Timoshenko, Stephen P., and James M. Gere. 1961. Theory of Elastic - Timoshenko, Stephen P., and James M. Gere. 1961. Theory of Elastic
@@ -190,3 +195,35 @@ class tube:
""" """
return self.E / (1 - self.nu**2) * (self.h / (2 * self.r))**2 return self.E / (1 - self.nu**2) * (self.h / (2 * self.r))**2
def buckling_thickness(self) -> float|None:
r"""Critical buckling thickness of a long thin circular tube uniformly
compressed by external pressure.
Returns:
- Thickness regarding the internal stress, if stress is given
.. math::
h_{\text{cr,}\sigma} = \sqrt{\sigma_\text{cr} \frac{1 - \nu^2}{E}} {2r}
- Thickness regarding the external pressure, if pressure is given
.. math::
h_\text{cr,q} = \left(q_\text{cr} \, 4 \frac{1 - \nu^2}{E}\right)^\frac{1}{3} {r}
- Otherwise given thickness or None
References:
- Timoshenko, Stephen P., and James M. Gere. 1961. Theory of Elastic
Stability. 2nd ed. New York: McGraw-Hill Book. p. 293.
"""
if self.scr is not None:
return np.sqrt(self.s * (1 - self.nu**2) / self.E) * (2 * self.r)
if self.qcr is not None:
return np.power(self.q * 4 * (1 - self.nu**2) / self.E, 1/3) * self.r
if self.h is not None:
return self.h
return None