Some events can be triggered at discrete times as an ODE problem * is solved. This occurs for example when the integration process * should be stopped as some state is reached (G-stop facility) when the * precise date is unknown a priori, or when the derivatives have * discontinuities, or simply when the user wants to monitor some * states boundaries crossings. *
* *These events are defined as occurring when a g
* switching function sign changes.
Since events are only problem-dependent and are triggered by the * independent time variable and the state vector, they can * occur at virtually any time, unknown in advance. The integrators will * take care to avoid sign changes inside the steps, they will reduce * the step size when such an event is detected in order to put this * event exactly at the end of the current step. This guarantees that * step interpolation (which always has a one step scope) is relevant * even in presence of discontinuities. This is independent from the * stepsize control provided by integrators that monitor the local * error (this event handling feature is available for all integrators, * including fixed step ones).
* *Note that is is possible to register a {@link * org.apache.commons.math.ode.events.EventHandler classical event handler} * in the low level integrator used to build a {@link FirstOrderIntegratorWithJacobians} * rather than implementing this class. The event handlers registered at low level * will see the big compound state whether the event handlers defined by this interface * see the original state, and its jacobians in separate arrays.
* *The compound state is guaranteed to contain the original state in the first * elements, followed by the jacobian with respect to initial state (in row order), * followed by the jacobian with respect to parameters (in row order). If for example * the original state dimension is 6 and there are 3 parameters, the compound state will * be a 60 elements array. The first 6 elements will be the original state, the next 36 * elements will be the jacobian with respect to initial state, and the remaining 18 elements * will be the jacobian with respect to parameters.
* *Dealing with low level event handlers is cumbersome if one really needs the jacobians * in these methods, but it also prevents many data being copied back and forth between * state and jacobians on one side and compound state on the other side. So for performance * reasons, it is recommended to use this interface only if jacobians are really * needed and to use lower level handlers if only state is needed.
* * @version $Revision: 1037341 $ $Date: 2010-11-20 22:58:35 +0100 (sam. 20 nov. 2010) $ * @since 2.1 * @deprecated as of 2.2 the complete package is deprecated, it will be replaced * in 3.0 by a completely rewritten implementation */ @Deprecated public interface EventHandlerWithJacobians { /** Stop indicator. *This value should be used as the return value of the {@link * #eventOccurred eventOccurred} method when the integration should be * stopped after the event ending the current step.
*/ int STOP = 0; /** Reset state indicator. *This value should be used as the return value of the {@link * #eventOccurred eventOccurred} method when the integration should * go on after the event ending the current step, with a new state * vector (which will be retrieved thanks to the {@link #resetState * resetState} method).
*/ int RESET_STATE = 1; /** Reset derivatives indicator. *This value should be used as the return value of the {@link * #eventOccurred eventOccurred} method when the integration should * go on after the event ending the current step, with a new derivatives * vector (which will be retrieved thanks to the {@link * org.apache.commons.math.ode.FirstOrderDifferentialEquations#computeDerivatives} * method).
*/ int RESET_DERIVATIVES = 2; /** Continue indicator. *This value should be used as the return value of the {@link * #eventOccurred eventOccurred} method when the integration should go * on after the event ending the current step.
*/ int CONTINUE = 3; /** Compute the value of the switching function. *The discrete events are generated when the sign of this * switching function changes. The integrator will take care to change * the stepsize in such a way these events occur exactly at step boundaries. * The switching function must be continuous in its roots neighborhood * (but not necessarily smooth), as the integrator will need to find its * roots to locate precisely the events.
* @param t current value of the independent time variable * @param y array containing the current value of the state vector * @param dydy0 array containing the current value of the jacobian of * the state vector with respect to initial state * @param dydp array containing the current value of the jacobian of * the state vector with respect to parameters * @return value of the g switching function * @exception EventException if the switching function cannot be evaluated */ double g(double t, double[] y, double[][] dydy0, double[][] dydp) throws EventException; /** Handle an event and choose what to do next. *This method is called when the integrator has accepted a step * ending exactly on a sign change of the function, just before * the step handler itself is called (see below for scheduling). It * allows the user to update his internal data to acknowledge the fact * the event has been handled (for example setting a flag in the {@link * org.apache.commons.math.ode.jacobians.ODEWithJacobians * differential equations} to switch the derivatives computation in * case of discontinuity), or to direct the integrator to either stop * or continue integration, possibly with a reset state or derivatives.
*isLast flag of the {@link
* org.apache.commons.math.ode.jacobians.StepHandlerWithJacobians#handleStep(
* StepInterpolatorWithJacobians, boolean) handleStep} method set to true and
* the integration will be stopped,The scheduling between this method and the {@link
* org.apache.commons.math.ode.jacobians.StepHandlerWithJacobians
* StepHandlerWithJacobians} method {@link
* org.apache.commons.math.ode.jacobians.StepHandlerWithJacobians#handleStep(
* StepInterpolatorWithJacobians, boolean) handleStep(interpolator, isLast)}
* is to call this method first and handleStep afterwards. This
* scheduling allows the integrator to pass true as the
* isLast parameter to the step handler to make it aware the step
* will be the last one if this method returns {@link #STOP}. As the
* interpolator may be used to navigate back throughout the last step (as {@link
* org.apache.commons.math.ode.sampling.StepNormalizer StepNormalizer}
* does for example), user code called by this method and user
* code called by step handlers may experience apparently out of order values
* of the independent time variable. As an example, if the same user object
* implements both this {@link EventHandlerWithJacobians EventHandler} interface and the
* {@link org.apache.commons.math.ode.sampling.FixedStepHandler FixedStepHandler}
* interface, a forward integration may call its
* eventOccurred method with t = 10 first and call its
* handleStep method with t = 9 afterwards. Such out of order
* calls are limited to the size of the integration step for {@link
* org.apache.commons.math.ode.sampling.StepHandler variable step handlers} and
* to the size of the fixed step for {@link
* org.apache.commons.math.ode.sampling.FixedStepHandler fixed step handlers}.
This method is called after the step handler has returned and * before the next step is started, but only when {@link * #eventOccurred} has itself returned the {@link #RESET_STATE} * indicator. It allows the user to reset the state vector for the * next step, without perturbing the step handler of the finishing * step. If the {@link #eventOccurred} never returns the {@link * #RESET_STATE} indicator, this function will never be called, and it is * safe to leave its body empty.
* @param t current value of the independent time variable * @param y array containing the current value of the state vector * the new state should be put in the same array * @param dydy0 array containing the current value of the jacobian of * the state vector with respect to initial state, the new jacobian * should be put in the same array * @param dydp array containing the current value of the jacobian of * the state vector with respect to parameters, the new jacobian * should be put in the same array * @exception EventException if the state cannot be reseted */ void resetState(double t, double[] y, double[][] dydy0, double[][] dydp) throws EventException; }