Sunday, January 01, 2017

Remote Object Invocation

The next in our series ...

Invocations on objects which are not replicated are traditionally based on the RPC as this retains the correct semantics of a procedure call i.e., a single flow (thread) of control from caller to callee and back again (as with a traditional procedure call). The previous entry described the concept of the Remote Procedure Call, and the simplified model of client-server interaction shown in the figure below will be assumed for the discussion to follow: a client uses the primitives sendjequest() for sending a call request and receive_result() for receiving the corresponding results. Clients and servers maintain enough state information to recognize and discard duplicate messages (filter requests). The server maintains a queue of messages from possibly multiple clients, and uses the primitive receive_re quest() to pick a message from the queue in a fifo order. After invoking the right method, the result is sent to the client with the send_result() primitive.
When making replicated invocations (such as when calling a replica group) the semantics of such communication differ considerably from that of the traditional RPC: there is no longer a single thread of control, but rather multiple threads which may all eventually return to the caller. Such invocations are typically referred to as Replicated Procedure Calls [Cooper 84a][Cooper 85], and can be implemented using one—to—many (or multicast) communication facilities. We discuss various aspects of multicast communication below.

One-to-Many Communication

The main services a multicast protocol provides can be categorised into three classes: ordering, reliability and latency. By imposing (increasing) ordering and reliability constraints on the delivery of multicast messages it is possible to define increasingly sophisticated protocols (typically at the expense of the latency). To understand these protocols first assume that a sender S is attempting to multicast to a group G = {P1,...,Pn}. Following the definitions outlined in [Shrivastava 90b][ANSA 90]:

Unordered and Unreliable

A multicast from S will be received by a subset of functioning nodes Pi ∈ G. Successive multicasts from S will be received in an arbitrary order at the destinations. The next figure shows sender S multicasting messages m1 and m2 to the group G. The first message is received by P2 and Pn in different orders, and message m2 is not received by P1

FIFO Multicast


Provided the sender does not crash while transmitting the message, all correctly functioning receivers are guaranteed to get the message. Furthermore, the multicasts will be received in the order they were made.

The next figure shows two senders (S 1 and S2) multicasting to the group G. All members of G received m1 before m2, but some members may receive m3 before m2. This last ordering is correct given the definition of the protocol: no information about the relative ordering of multicasts between senders is available to the receivers.

Atomic multicast


If the sender does not crash before completing a multicast, the message is guaranteed to be received by all functioning members. If, however, the sender crashes during a multicast, then it is guaranteed that the message is received by either all or none of the functioning processes (atomic deliveiy). All multicasts from the same sender are received in the order they were made.

Causal multicast

This multicast extends the ordering property of the Atomic multicast to causally related sends from different senders while still meeting the reliability guarantee. [Lamport 78] was the first to introduce the concept of potential causal relationships into computer interactions and showed what effects these relationships can have on the operations of interacting processes. Two events are potentially causally related if information from the first event could have reached the second event before it occurred. The notation used to denote such relationships is typically X → Y, where → means precedes (happened before). Note that if X and Y are events from the same process and Y follows X then Y is necessarily causally related to X. A causal communication system will only preserve an ordering of events if the order is causally related. If two events are not related in this way then there is no guarantee on the delivery order.
In the figure above S1 is multicasting the groups G 1and G2, P1is multicasting to group G1. G1={P2, P3} and G2={P1, P4}.Thereisapotentialflowofinformationfromsend(m1,Gi) to send(m2,G2), and from send(m 2,0 2) to send(m3,G1). This means that the sending of m3 by Pi is potentially causally related to the sending of m1 by S1. Hence the causal multicast protocol must ensure that all functioning members of G 1receive m1 before m3. Events such as m3 and m4 which are not causally related can be received in any order (they are termed concurrent).

Totally ordered multicast

The (partial) causal order can be extended to a total order of messages such that all messages (whether causally related or not) are received by all destinations in the same order (which must also preserve causality).

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